Effective Matrix Methods in Commutative Domains
Gennadi Malaschonok
TL;DR
This paper discusses advanced matrix methods for solving linear algebra problems in commutative domains, introducing two new techniques for computing adjoint matrices and solving linear systems.
Contribution
It presents two novel methods specifically designed for matrix computations in commutative domains, expanding existing linear algebra tools.
Findings
New methods for computing adjoint matrices.
New methods for solving linear systems.
Enhanced efficiency in commutative domain computations.
Abstract
Effective matrix methods for solving standard linear algebra problems in a commutative domains are discussed. Two of them are new. There are a methods for computing adjoined matrices and solving system of linear equations in a commutative domains.
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Taxonomy
TopicsMatrix Theory and Algorithms · Polynomial and algebraic computation · Algebraic and Geometric Analysis